Only $S_1$ is correct!
A DFA with $3$ states will be needed, as the strings in the language $S_1$ are $00, 0000, 000000,$ and so on. which is the set of all strings with even number of $0's$ and with length greater than $0$. We would have needed only $2$ sates had empty string also been in the language but $n\geq 1$ prohibits it and so we need $3$ states in our DFA. This assumes that the language is over $\{0\}$ and not $\{0,1\}.$
$S_2$ is DCFL as we need to do infinite counting of $0's$ and $1's$ here.